A. G. Postnikov scite author profile

Leclerc and Zelevinsky described quasicommuting families of quantum minors in terms of a certain combinatorial condition, called weak separation. They conjectured that all inclusion‐maximal weakly separated collections of minors have the same cardinality, and that they can be related to each other by a sequence of mutations. Postnikov studied total positivity on the Grassmannian. He described a stratification of the totally non‐negative Grassmannian into positroid strata, and constructed theirparameterization using plabic graphs. In this paper, we link the study of weak separation to plabic graphs. We extend the notion of weak separation to positroids. We generalize the conjectures of Leclerc and Zelevinsky, and related ones of Scott, and prove them. We show that the maximal weakly separated collections in a positroid are in bijective correspondence with the plabic graphs. This correspondence allows us to use the combinatorial techniques of positroids and plabic graphs to prove the (generalized) purity and mutation connectedness conjectures.

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Introduction to Analytic Number Theory

Postnikov¹

1988

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Arithmetic Simulation of Random Processes

Postnikov¹

1963

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Universal Tutte polynomial

Bernardi¹,

Kálmán²,

Postnikov³

2020

Preprint

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The Tutte polynomial is a well-studied invariant of graphs and matroids. We first extend the Tutte polynomial from graphs to hypergraphs, and more generally from matroids to polymatroids, as a two-variable polynomial. Our definition is related to previous works of Cameron and Fink and of Kálmán and Postnikov. We then define the universal Tutte polynomial Tn, which is a polynomial of degree n in 2 + (2 n − 1) variables that specializes to the Tutte polynomials of all polymatroids (hence all matroids) on a ground set with n elements. The universal polynomial Tn admits three kinds of symmetries: translation invariance, Sn-invariance, and duality.

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A Local Limit Theorem for the Distribution of Fractional Parts of an Exponential Function

Moskvin¹,

Postnikov²

1979

Theory Probab. Appl.

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A. G. Postnikov

Weak separation and plabic graphs

Introduction to Analytic Number Theory

Arithmetic Simulation of Random Processes

Universal Tutte polynomial

A Local Limit Theorem for the Distribution of Fractional Parts of an Exponential Function

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